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Journal of Romance Studies, 2007
This article considers the significance of mathematical patterns on the poetry and prose of Jacques Roubaud, a leading Oulipian whose image as a poet-mathematician is now so well-known that almost every study of his work mentions both dimensions of the man.
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This article considers the significance of mathematical patterns on the poetry and prose of Jacques Roubaud, a leading Oulipian whose image as a poet-mathematician is now so well-known that almost every study of his work mentions both dimensions of the man.
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Stirling Numbers and Eulerian Numbers
2016This chapter is dedicated to counting partitions of sets and partitions of sets into cycles, and also introduces Stirling numbers and Bell numbers. As an application of the concepts discussed here we state Faa di Bruno chain rule for the n-th derivative of a composite of n-times differentiable functions on \(\mathbb R\).
Carlo Mariconda, Alberto Tonolo
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Pediatrics, 1983
To the Editor.— A recent letter1 suggested that a "gaffe" and "blunder" was committed by the author of an earlier article.2 The letter is signed, "Student," reminding us of W. S. Gossett, the original "Student" of "Student's t-distribution" fame.
H C, Davis, A, Robertson
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To the Editor.— A recent letter1 suggested that a "gaffe" and "blunder" was committed by the author of an earlier article.2 The letter is signed, "Student," reminding us of W. S. Gossett, the original "Student" of "Student's t-distribution" fame.
H C, Davis, A, Robertson
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Perfect Numbers, Abundant Numbers, and Deficient Numbers
The Mathematics Teacher, 1970For several centuries students of mathematics have been fascinated by the system of positive integers and some of the remarkable properties that it possesses. Among the positive integers that have received special investigation are perfect numbers, abundant numbers, and deficient numbers.
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Number Fields and Number Rings
1977A number field is a subfield of ℂ having finite degree (dimension as a vector space) over ℚ. We know (see appendix 2) that every such field has the form ℚ[α] for some algebraic number α ∈ ℂ. If α is a root of an irreducible polynomial over ℚ, having degree n, then $$\mathbb{Q}[\alpha ] = \left\{ {{a_o} + {a_1}\alpha + \cdots + {a_{n - 1}}{\alpha ...
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The Fibonacci Quarterly, 1968
This paper is of an expository nature and is concerned mainly with the arithmetic properties of the Bernoulli numbers. Following an introductory section which reviews the basic formulas for the Bernoulli and Euler numbers and polynomials, the following topics are discussed: the Staudt-Clausen theorem, Kummer's congruences and some related properties ...
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This paper is of an expository nature and is concerned mainly with the arithmetic properties of the Bernoulli numbers. Following an introductory section which reviews the basic formulas for the Bernoulli and Euler numbers and polynomials, the following topics are discussed: the Staudt-Clausen theorem, Kummer's congruences and some related properties ...
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Locomotor behavior: numbers, numbers, numbers!
Pharmacology Biochemistry and Behavior, 1987Carl A. Boast, Paul R. Sanberg
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